Michael V. Klibanov
Affiliations: | Applied Mathematics (PhD) | University of North Carolina, Charlotte, Charlotte, NC, United States |
Area:
Applied MathematicsGoogle:
"Michael Klibanov"Children
Sign in to add trainee| Sergey Pamyatnykh | grad student | 2006 | UNC Charlotte |
| Andrey Kuzhuget | grad student | 2011 | UNC Charlotte |
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Publications
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| Smirnov AV, Klibanov MV, Nguyen LH. (2020) Convexification for a 1D hyperbolic coefficient inverse problem with single measurement data Inverse Problems and Imaging. 14: 913-938 |
| Klibanov MV, Nguyen D. (2020) Retraction of: Convergence of a series associated with the convexification method for coefficient inverse problems Journal of Inverse and Ill-Posed Problems. 29: 157-157 |
| Klibanov MV, Nguyen D. (2020) Convergence of a series associated with the convexification method for coefficient inverse problems Journal of Inverse and Ill-Posed Problems |
| Thành NT, Klibanov MV. (2020) Solving a 1-D inverse medium scattering problem using a new multi-frequency globally strictly convex objective functional Journal of Inverse and Ill-Posed Problems. 28: 693-711 |
| Khoa VA, Klibanov MV, Nguyen LH. (2020) Convexification for a Three-Dimensional Inverse Scattering Problem with the Moving Point Source Siam Journal On Imaging Sciences. 13: 871-904 |
| Klibanov MV, Le TT, Nguyen LH. (2020) Numerical Solution of a Linearized Travel Time Tomography Problem With Incomplete Data Siam Journal On Scientific Computing. 42: B1173-B1192 |
| Smirnov AV, Klibanov MV, Sullivan A, et al. (2020) Convexification for an inverse problem for a 1D wave equation with experimental data Inverse Problems. 36: 95008 |
| Klibanov MV, Li J, Zhang W. (2020) Convexification for an Inverse Parabolic Problem Inverse Problems. 36: 85008 |
| Khoa VA, Bidney GW, Klibanov MV, et al. (2020) Convexification and experimental data for a 3D inverse scattering problem with the moving point source Inverse Problems. 36: 85007 |
| Khoa VA, Bidney GW, Klibanov MV, et al. (2020) An inverse problem of a simultaneous reconstruction of the dielectric constant and conductivity from experimental backscattering data Inverse Problems in Science and Engineering. 1-24 |